Authors : Vidya Sharma and Nilesh Bhongade
Page Nos : 391-393
Description :
The Mellin transform is an integral transform that may regarded as the multiplicative version of the two sided Laplace transform. Mellin transform is basic tool for analyzing the behaviour of many in Mathematics and mathematical physics. The Mellin transform is widely used in computer science for the analysis of algorithms because of its scale invariance property. Mellin transform has many applications such as navigation, radar system, in finding the stress distribution in an infinite wedge, also in digital audio effects. Mellin transform, a kind of nonlinear transformation, is widely used for its scale invariance property. So it has special importance in scale representation of signal. The Wavelet transform has been shown to be a successful tool for dealing with transient signals, data compression, sound analysis, representation of the human retina. The Wavelet transform is done similar like to Short Term Fourier Transform (STFT) analysis. In this paper convolution theorem of Mellin-Wavelet transform is proved.
